QT-Symmetry and Weak Pseudo-Hermiticity
Abstract
For an invertible (bounded) linear operator Q acting in a Hilbert space H, we consider the consequences of the QT-symmetry of a non-Hermitian Hamiltonian H: H H where T is the time-reversal operator. If H is symmetric in the sense that T H T=H, then QT-symmetry is equivalent to Q-1-weak-pseudo-Hermiticity. But in general this equivalence does not hold. We show this using some specific examples. Among these is a large class of non-PT-symmetric Hamiltonians that share the spectral properties of PT-symmetric Hamiltonians.
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